On the geometric quantization of θ-almost twisted Poisson manifold

Abstract

A θ-almost twisted Poisson manifold is a manifold M together with a bivector field , a 3-form , and a closed 1-form θ such that the exterior derivative d of is the wedge product of θ and , the anchor \#(θ) of θ is identically zero, and the Jacobiator (Jacobi operator; which is half the Schouten-Nijenhuis bracket of with itself) associated to is the anchor \#() of . In this work, we define the notion of a contravariant derivative adapted to these manifolds and establish the prequantization condition in terms of the θ-almost twisted Poisson cohomology. We then introduce a polarization and construct a quantum Hilbert space. These results are illustrated by examples.